Lipschitz homotopy and density of Lipschitz mappings in Sobolev spaces

Abstract

We construct a smooth compact n-dimensional manifold Y with one point singularity such that all its Lipschitz homotopy groups are trivial, but Lipschitz mappings Lip(Sn,Y) are not dense in the Sobolev space W1,n(Sn,Y). On the other hand we show that if a metric space Y is Lipschitz (n-1)-connected, then Lipschitz mappings Lip(X,Y) are dense in N1,p(X,Y) whenever the Nagata dimension of X is bounded by n and the space X supports the p-Poincare inequality.